Title :
Stability and Convergence Analysis for a Class of Neural Networks
Author :
Gao, Xingbao ; Liao, Li-Zhi
Author_Institution :
Coll. of Math. & Inf. Sci., Shaanxi Normal Univ., Xi´´an, China
Abstract :
In this paper, we analyze and establish the stability and convergence of the dynamical system proposed by Xia and Feng, whose equilibria solve variational inequality and related problems. Under the pseudo-monotonicity and other conditions, this system is proved to be stable in the sense of Lyapunov and converges to one of its equilibrium points for any starting point. Meanwhile, the global exponential stability of this system is also shown under some mild conditions without the strong monotonicity of the mapping. The obtained results improve and correct some existing ones. The validity and performance of this system are demonstrated by some numerical examples.
Keywords :
Lyapunov methods; asymptotic stability; convergence of numerical methods; neural nets; Lyapunov system; convergence analysis; dynamical system; equilibrium points; global exponential stability; mapping; neural networks; pseudomonotonicity; variational inequality; Asymptotic stability; Convergence; Jacobian matrices; Mathematical model; Neural networks; Stability analysis; Trajectory; Convergence; exponential stability; neural network; variational inequality; Algorithms; Neural Networks (Computer); Nonlinear Dynamics; Pattern Recognition, Automated; Reproducibility of Results;
Journal_Title :
Neural Networks, IEEE Transactions on
DOI :
10.1109/TNN.2011.2167760
